会议名称(英文): 2014Symbolic-Numeric Computation
所属学科: 计算数学与科学工程计算,概率论与数理统计,应用数学
开始日期: 2014-07-28
结束日期: 2014-07-31
所在国家: 中华人民共和国
所在城市: 上海市 黄浦区
具体地点: 华东师范大学
主办单位: Chinese National Natural Science Foundation
全文截稿日期: 2014-03-24
论文录用通知日期: 2014-04-28
会议网站: http://symbolic-numeric-computation.org/snc-2014/index.html
会议背景介绍:
Overview
Algorithms that combine techniques from symbolic and numeric computation have been of increasing importance and interest over the past decade. The necessity to work reliably with imprecise and noisy data, and for speed and accuracy within algebraic and hybrid-numerical problems, has encouraged a new synergy between the numerical and symbolic computing fields. Novel and exciting problems from industrial, mathematical and computational domains are now being explored and solved.
The goal of the present workshop is to support the interaction and integration of symbolic and numeric computing. Earlier meetings in this series include the SNAP 96 Workshop, held in Sophia Antipolis, France, the SNC 2005 meeting, held in Xi'an, China, SNC 2007 held in London, Canada, SNC 2009, held in Kyoto, and SNC 2011, held in San Jose, California USA.
This forthcoming International Workshop on Symbolic-Numeric Computation will be held July 28 to 31 in Shanghai, China, immediately following the ISSAC 2014 Symposium to be held in nearby Kobe, Japan.
征文范围及要求:
Call for Papers
The first announcement and call for papers is now available at http://symbolic-numeric-computation.org/snc-2014/cfp/CFP-SNC-2014-First-Call.pdf.
Conference Topics
Specific topics of SNC 2014 include, but are not limited to:
Hybrid symbolic-numeric algorithms in linear, polynomial and differential algebra
Approximate polynomial GCD and factorization
Symbolic-numeric methods for solving polynomial systems
Resultants and structured matrices for symbolic-numeric computation
Differential equations for symbolic-numeric computation
Symbolic-numeric methods for geometric computation
Symbolic-numeric algorithms in algebraic geometry
Symbolic-numeric algorithms for nonlinear optimization
Implementation of symbolic-numeric algorithms
Model construction by approximate algebraic algorithms
Applications of symbolic-numeric computation: global optimization, verification, etc. |
